TY - JOUR
T1 - Median Graphs and Triangle-Free Graphs
AU - Imrich, Wilfried
AU - Klavžar, Sandi
AU - Mulder, Henry Martyn
PY - 1999
Y1 - 1999
N2 - Let M (m, n) be the complexity of checking whether a graph G with m edges and n vertices is a median graph. We show that the complexity of checking whether G is triangle-free is at most O(M(m, m)). Conversely, we prove that the complexity of checking whether a given graph is a median graph is at most O(m log n + T(m log n, n)), where T(m, n) is the complexity of finding all triangles of the graph. We also demonstrate that, intuitively speaking, there are as many median graphs as there are triangle-free graphs. Finally, these results enable us to prove that the complexity of recognizing planar median graphs is linear.
AB - Let M (m, n) be the complexity of checking whether a graph G with m edges and n vertices is a median graph. We show that the complexity of checking whether G is triangle-free is at most O(M(m, m)). Conversely, we prove that the complexity of checking whether a given graph is a median graph is at most O(m log n + T(m log n, n)), where T(m, n) is the complexity of finding all triangles of the graph. We also demonstrate that, intuitively speaking, there are as many median graphs as there are triangle-free graphs. Finally, these results enable us to prove that the complexity of recognizing planar median graphs is linear.
KW - Algorithm
KW - Complexity
KW - Median graph
KW - Triangle-free graph
UR - http://www.scopus.com/inward/record.url?scp=0011269199&partnerID=8YFLogxK
U2 - 10.1137/S0895480197323494
DO - 10.1137/S0895480197323494
M3 - Article
AN - SCOPUS:0011269199
SN - 0895-4801
VL - 12.1999
SP - 111
EP - 118
JO - SIAM journal on discrete mathematics
JF - SIAM journal on discrete mathematics
IS - 1
ER -